How to simplify binomials - PSAT Math
Card 1 of 14
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
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Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
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If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
← Didn't Know|Knew It →
Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
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If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
← Didn't Know|Knew It →
Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
← Didn't Know|Knew It →
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
← Didn't Know|Knew It →
Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
← Didn't Know|Knew It →
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
← Didn't Know|Knew It →
Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
← Didn't Know|Knew It →
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
← Didn't Know|Knew It →
Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
← Didn't Know|Knew It →
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
If 〖(x+y)〗2 = 144 and 〖(x-y)〗2 = 64, what is the value of xy?
Tap to reveal answer
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
We first expand each binomial to get x2 + 2xy + y2 = 144 and x2 - 2xy + y2 = 64. We then subtract the second equation from the first to find 4xy = 80. Finally, we divide each side by 4 to find xy = 20.
← Didn't Know|Knew It →
Which of these expressions can be simplified further by collecting like terms?
Which of these expressions can be simplified further by collecting like terms?
Tap to reveal answer
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
A binomial can be simplified further if and only if the two terms have the same combination of variables and the same exponents for each like variable. This is not the case in any of the four binomials given, so none of the expressions can be simplified further.
← Didn't Know|Knew It →